A search for primes p such that Euler number Ep-3 is divisible by p

Abstract

Let p>3 be a prime. Euler numbers Ep-3 first appeared in H. S. Vandiver's work (1940) in connection with the first case of Fermat Last Theorem. Vandiver proved that xp+yp=zp has no solution for integers x,y,z with (xyz,p)=1 if Ep-3 0 ( p). Numerous combinatorial congruences recently obtained by Z.-W. Sun and by Z.-H. Sun involve the Euler numbers Ep-3. This gives a new significance to the primes p for which Ep-3 0 ( p). For the computation of residues of Euler numbers Ep-3 modulo a prime p, we use the congruence which runs significantly faster than other known congruences involving Ep-3. Applying this congruence, a computation via Mathematica 8 shows that only three primes less than 107 satisfy the condition Ep-3 0 ( p) (such primes are 149, 241 and 2946901, and they are given as a Sloane's sequence A198245). By using related computational results and statistical considerations similar to those on search for Wieferich and Fibonacci-Wieferich and Wolstenholme primes, we conjecture that there are infinitely many primes p such that Ep-3 0 ( p). Moreover, we propose a conjecture on the asymptotic estimate of number of primes p in an interval [x,y] such that Ep-3 A ( p) for some integer A with |A|∈ [K,L].